A \( \mathcal{N}=2 \) supersymmetric \(\mathrm{AdS}_{4}\) solution in M-theory with purely magnetic flux
From MaRDI portal
Publication:2635923
DOI10.1007/JHEP10(2015)004zbMath1388.81860arXiv1507.02660MaRDI QIDQ2635923
Jesús Montero, Niall T. Macpherson, Yolanda Lozano
Publication date: 31 May 2018
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1507.02660
Related Items (10)
\( \mathrm{AdS}_2\) geometries and non-abelian T-duality in non-compact spaces ⋮ Three-dimensional \( \mathcal{N}=4 \) linear quivers and non-abelian T-duals ⋮ New \(\mathrm{AdS}_{3}\times S^{2}\) T-duals with \(\mathcal{N}=(0,4)\) supersymmetry ⋮ \(\mathrm{Mink}_{3} \times S^{3}\) solutions of type II supergravity ⋮ Two dimensional \(\mathcal{N} = (0, 4)\) quivers dual to \(\mathrm{AdS}_3\) solutions in massive IIA ⋮ D-branes and non-abelian T-duality ⋮ Line defects as brane boxes in Gaiotto-Maldacena geometries ⋮ BMN vacua, superstars and non-abelian T-duality ⋮ \(\mathrm{AdS}_{6}\) T-duals and type IIB \(\mathrm{AdS}_{6} \times S^2\) geometries with 7-branes ⋮ Penrose limits of abelian and non-abelian T-duals of \(\mathrm{AdS}_{5} \times S^5\) and their field theory duals
Cites Work
- Hints of 5d fixed point theories from non-abelian T-duality
- New \(\mathcal N=1\) supersymmetric \(\mathrm{AdS}_5\) backgrounds in type IIA supergravity
- A note on supersymmetric \(\mathrm{AdS}_6\) solutions of massive type IIA supergravity.
- Gauge theories labelled by three-manifolds
- \({\mathcal N=2}\) supersymmetric \(\mathrm{AdS}_4\) solutions of M-theory
- \(\mathcal N= 6\) superconformal Chern-Simons-matter theories, M2-branes and their gravity duals
- Non-abelian T-duality, Ramond fields and coset geometries
- \( {\text{SL}}\left( {2,\mathbb{R}} \right) \) Chern-Simons, Liouville, and gauge theory on duality walls
- On non-Abelian T-dual geometries with Ramond fluxes
- Non-abelian T-duality, \(G_{2}\)-structure rotation and holographic duals of \(\mathcal{N}= 1\) Chern-Simons theories
- 3d Chern-Simons theory from M5-branes
- Dualising the baryonic branch: dynamic \(\operatorname{SU}(2)\) and confining backgrounds in IIA
- Five-dimensional supersymmetric gauge theories and degenerations of Calabi-Yau spaces
- Branes, superpotentials and superconformal fixed points
- \(T\)-duality, space-time spinors and R-R fields in curved backgrounds
- \(U\)-duality and BPS spectrum of super Yang-Mills theory and M-theory
- Five-branes, seven-branes and five-dimensional \(E_n\) field theories
- 3d-3d correspondence revisited
- Complex Chern-Simons from M5-branes on the squashed three-sphere
- Type IIB supergravity solutions with \(\mathrm{AdS}_{5}\) from abelian and non-abelian T dualities
- 5d quivers and their \(\mathrm{AdS}_6\) duals
- The gravity duals of \( \mathcal{N}=2 \) superconformal field theories
- Extremal transitions and five-dimensional supersymmetric field theories
- Some global aspects of duality in string theory
- On non-abelian T-duality and new \(\mathcal{N} = 1\) backgrounds
- Non-abelian T-duality and the AdS/CFT correspondence: new \(N=1\) backgrounds
- 3-manifolds and 3d indices
- Supersymmetric \(\mathrm{ AdS}_5\) solutions of massive IIA supergravity
- \(\mathrm{AdS}_4\) compactifications of \(\mathrm{AdS}_7\) solutions in type II supergravity
- New \(\mathrm{AdS}_{3}\times S^{2}\) T-duals with \(\mathcal{N}=(0,4)\) supersymmetry
- Non-abelian T-dualizing the resolved conifold with regular and fractional D3-branes
- Perturbing gauge/gravity duals by a Romans mass
- Spontaneous compactification of seven-dimensional supergravity theories
- Kaluza-Klein Monopole and 5-brane Effective Actions
- Supersymmetry and non-Abelian T-duality in type II supergravity
- Supersymmetric AdS 5 solutions of type IIB supergravity
- Supergravity and a confining gauge theory: Duality cascades and \(\chi SB\)-resolution of naked singularities
- The D4--D8 brane system and five-dimensional fixed points
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